ME2121Engineering Thermodynamics
First Law of ThermodynamicsProf. A.S. Mujumdar
Refer to Chapter 4, Cengel & Boles
Conservation of Energy Principle
! For a system, it simply says
Total energy entering- total energy leaving
= Change in total energy of the systemAlso known as Energy Balance eqn.
First Law-Implications
! Energy cannot be created or destroyed! Empirically it is observed that for a closed system all
adiabatic processes between same fixed initial and final states, net work done is the same!
! Proof of law is in lack of evidence- no reliable data contradict this principle!
! Implies existence of total energy as a property of a system
! Also known as the conservation of energy principle
Energy Balance
! Net change of total energy of a system equals difference between the total energy entering and leaving the system- energy balance equation
! Mechanisms of energy change:1. Heat transfer, Q2. Work, W3. Mass flow, m For open systems.
Total Energy, E
! It is sum of internal, kinetic and potential energies
! Mechanisms of energy transfer are: heat, work or mass flow (for an open system or control volume)
! Total energy pr unit mass is an intensive property denoted by e (= E/m)
Energy balance for closed system
! Q – W = delta E! Where Q is net heat input ( in –out)
and W is the net work output ( out-in).! First Law cannot be proven
mathematically- no violation has been found yet!
! Examples 4.2- 4.7 give simple applications of First Law statement-please read carefully.
Section 4.2 C7B! Here you find a number of illustrative
examples of application of energy conservation laws (Examples 4.1 thru 4.8)
! Also, study tutorial problems and additional review problems
! Note difference between closed and open systems
! When there are any flow streams we must consider control volumes.
Section 4.3 Steady State Systems
! Many engineering devices such as compressors, turbines operate under steady (time-invariant) conditions.
! No intensive or extensive properties within a C V change with time
! For S.S. conditions, mass balance simply results in product of average velocity times the cross-sectional area being constant as inlet and outlet.
! Also applies for multiple inlets and outlets.
Schematics of Engineering Devices
! The following two slides give in a concise tabular form different types of devices which you need to be familiar with for thermodynamic analysis
! Note that the design of such devices is in the areas of fluid mechanics, heat and mass transfer
! We will consider only equilibrium thermodynamics of such devices.
Obtain higher pressure at exit
P2 > P1V1 > V2
P2, T2, V2P1, T1, V1Compressor
Generate power, extract useful work from kinetic energy of liquid, gas or vapor (steam)
P2 < P1V2 > V1Adiabatic
P2, T2, V2P1, T1, V1Turbine
Pressure recovery,Distribute fluid, pumps, compressors, etc.
V1 >> V2P2, T2, V2, A2P1, T1, Vv1, A1Diffuser
Jet engines, turbines, compressors, flow measurement, etc.
V2 >> V1P2, T2, V2, A2P1, T1, V1, A1Nozzle
ApplicationRemarksOutlet conditions
Inlet conditionsSchematicDevice
Some Steady Flow Engineering Devices-1
Some Steady Flow Engineering Devices-2
Heating or cooling of fluids
T2 < T1 (cooling)T2 > T1 (heating)m1 = m2m1h1 + Q = m2h2
m2, T2m1, T1Heat exchanger
Mixing of streamsm3 =m1+m2m3h3 =m1h1+m2h2
M3, T3m1, m2, T1, T2
Mixer
Flow restricting device to increase pressure drop, i.e. reduce pressure.Joule-Thomson effect, Causes cooling
P2 << P1T2 < T1h2 = h1Iso-enthalpicprocess
P2, T2, V2, A2
P1, T1, V1, A1
Throttling valve
ApplicationRemarksOutlet conditions
Inlet conditions
SchematicDevice
Q
Notation
! Subscripts 1 and 2 refer to the inlet and outlet conditions of the device
! m refers to the mass flow rate (no just mass)! Details and illustrative worked examples are
provided in Chapter 4 of the textbook.! Do become familiar with the key features of
the devices e.g. ones that can be treated as adiabatic or isoenthalpic etc.
Section 4.3 Steady-flow Systems: Energy Balance equations
! Mass balance for SFS:
Also good for single/multiple inlets/outlets
! Note that we assume velocity is average velocity across cross-section of inlet or outlet. If a velocity distribution is given ( in most real situations this is true) the one must integrate across the cross –section of inlet/outlet tubes etc.
)s/kg(mm outin && ====
Rate form of energy equation for open systems ( Control volumes)
! For a control volume (open system)! Rate of net energy transfer by work, heat and
mass equals rate of change of internal energy of the C.V. i.e. Eqn 4.5 (C&B)
! The dot denotes time derivative
)kW(EEE systemoutin&&& ∆∆∆∆====−−−−
Some SF Engineering Devices:Nozzles, Diffusers, Turbines and Compressors
! Section 4.4 gives clear explanation for these devices with pictures/schematics- please look these up
! Nozzle shaped to accelerate flow and a diffuser is shaped to decelerate flow to raise static pressure (outcome of Bernoulli equation!)
! A turbine extracts energy from flowing fluid (gas, steam, water) to generate useful work/ electricity. Work done by fluid taken as positive since it is done by the fluid.
Engineering devices (Cont’d)
! Compressors ( also pumps, fans, blowers etc) are used to raise pressure of fluid by performing work
! Heat transfer typically is small for both turbines and compressors ( well insulated)
! Potential energy changes are also negligible
! Although velocity changes are large they are often small relative to changes of enthalpy in turbines
Examples
! We will review examples 4-11 and 4-13 separately later on.
Throttling Valves
! Any device that causes a drop in pressure by constricting flow e.g. valves, capillary tubes, porous plugs etc
! Drop in pressure can be associated with appreciable temperature drop- hence used in refrigeration equipment (Joule Thompson effect)
! For such devices, heat transfer, potential energy changes are neglected and ,of course, no work is done as well!
! Hence called isoenthalpic device!
Example-Throttling of R-134a in a capillary tube (4.13 C&B)
Problem statementRefrigerant R134-a enters a capillary tube of a
refrigerator as a saturated liquid at 0.8MPa and is throttled to a pressure of 0.12 MPa. Find temperature drop that occurs in this process.
Variants: Different refrigerants at different pressures at inlet/outlet.
Note: enthalpy is same at inlet and outlet for such a throttling process. WHY?
Outline of solution! Determine thermo properties of R-134a (TableA-12 of
Appendix) at inlet /exit
! Show that specific enthalpy at MPa of 0.12 (exit)
! Places the fluid in two-phase mixture state- saturated vapor-gas mixture. Find quality x from enthaply of satd liquid and satd vapor phases at saturation of temperature of -22.4 Celsius.
! If we want onlt exit temperature ,it is simply satntemperature at exit pressure of 0.12 MPa .
Some examples of application of the First LawProblem Statement:The compressor in a plant receives carbon dioxide at 100 kPa, 280
K, with a low velocity. At the compressor discharge, the carbon dioxide exits at 1100 kPa, 500 K, with velocity of 25 m/s and then flows into a constant-pressure aftercooler (heat exchanger) where it is cooled down to 350 K. The power input to the compressor is 50 kW. Determine the heat transfer rate in the aftercooler.
Sketch a schematic of the process. Let subscripts 1, 2, and 3 represent gas condition at inlet to compressor, at exit of compressor and at exit of aftercooler.
Outline of SolutionAssumptions: Steady state, no heat losses, single inlet and single exit
flow. We use control volume approach since there is flow.
Apply energy equationq + h1 + ½ V1
2 = h2 + ½ V22 + w per kg of fluid
Here q = 0, V1 = 0. (assumed no potential energy change)
Obtain values of h from property tablesh1 = 198 kJ/kg . Insert V2 = 25 m/sHence w = -203.8 kJ/kg. Since total power input is 50 kW the mass flow rate of CO2 is -50/-203.8 or 0.245 kg/s
Solution Cont’dNext take aftercooler as the C.V., steady state, single
entry and exit, no work termNow energy equation becomesq + h2 + ½ V2
2 = h3 + ½ V32
Inserting values q = h3 – h2 = 257.9 – 401.5 = -143.6 kJ/kgCooling rate = 0.245 kg/s x 143.6 kJ/kg = 35.2 kW
Suggestions for self-study: If the cooling rate is 200 kJ/kg what would be the exit temperature after the
aftercooler?(SBV 6-180)
Example (SBV 6-178)
A small liquid water pump is located 15 m down in a well, taking water in at 10°C, 90 kPa at a rate of 1.5 kg/s. The exit line is a pipe of diameter 0.04 m that goes up to a receiver tank maintaining a gauge pressure of 400 kPa. Assume the process is adiabatic with the same inlet and exit velocities and that the water stays at 10°C. Find the required pump work.
Draw a sketch showing the control volume consisting of the pump plus pipe. Assume no heat transfer, constant velocity and steady state.
Brief Solution
Continuity Equation:
Also,
(v is constant and u is constant)
WgZV21hmgZV
21hm
mmm
ex2exexin
2inin
exin
&&&
&&&
++++
++++++++====
++++++++
========
v)PP(hh inexinex −−−−++++====
Solution Cont’d
From the energy equation
That is, the pump requires a power input of 840 W
[[[[ ]]]]
)kW84.0)412.0147.0(x5.1kgm001001.0kPa)903.101400(m
1000015x
sm807.9x
skg5.1
v)PP()ZZ(gm)gZhgZh(mW3
2
inexexinexexinin
−−−−====−−−−−−−−====
−−−−++++−−−−−−−−−−−−====
−−−−−−−−−−−−====−−−−−−−−++++==== &&&
Problem for Self-Study (MS 4-164)
A tank having a volume of 0.85 m3 initially contains water as a two-phase liquid – vapor mixture at 260°C and a quality of 0.7. Saturated water vapor at 260°C is slowly withdrawn through a pressure-regulating valve at the top of the tank as energy is transferred by heat to maintain the pressure constant in the tank. This continues until the tank is filled with saturated vapor at 260°C. Determine the amount of heat transfer, in kJ. Neglect all kinetic and potential energy effects.
Hints on the next slideWork out the solution on your own. Do we need to treat
it as a unsteady state problem?
Withdrawing steam from tank at constant pressure – hints for solution
Known: A tank initially holding a two-phase liquid-vapor mixture is heated while saturated water vapor is slowly removed. This continues at constant pressure until the tank is filled only with saturated vapor.
Find: Determine the amount of heat transfer.
Question: Do we need to know the heat losses from the tank or make assumptions about it?
Withdrawing steam from tank at constant pressure – hints for solution (Cont’d)
During the process of withdrawing saturated steam (vapor) the process is transient. However we need only to calculate the heat transferred over the entire process, i.e. difference in heat content of tank at the end of the process and the initial state of the process.
First Law indicates that the heat transferred should equal the difference in internal energy of the mass contained in the C.V. at the beginning and at the end minus the enthalpy of the mass lost by the tank over the duration of the process. Note that exit condition of the withdrawn steam is fixed.
Answer: Q = 14,160 kJ (small differences may occur due to use ofdifferent steam tables)
Engineering Devices: Heat Exchangers
! Two flowing fluid streams exchange heat usually without mixing
! Usually no work interactions ( w=0); no changes in kinetic and potential energy either
! Direct contact heat exchangers do involve mixing of fluid streams at different temperatures
! Control volumes could be entire heat exchanger or the volume occupied by one of the fluids
! Study worked example 4.15-cooling of R-134a
Energy Balance for unsteady processes
! Unsteady and transient flow processes involve changes within CV with time
! Unlike steady processes ,unsteady processes occur over finite times-hence we consider changes of energy/mass over small increments of time delta t.
! Example 4.18 of text illustrates the principle with simple example of a pressure cooker. Assigned for self-study! For assessment, we will focus on steady flow processes.
Closure-First Law! Conservation of energy principles
! Definitions of internal energy, specific heats, enthalpy
! Applications to closed and open systems
! Study worked examples from textbook. For further clarification do work out the tutorial problems
! Need to know how to use thermodynamic property tables, ideal gas law
! Now we will study some example applications including some tutorial problems
Some Examples from Tutorial Set No. 2
The following slides present solutions to two problems which involve application of the First Law as well as determination of thermodynamic properties using thermodynamic property tables.
Please attempt the solutions on your own after the class; check the solution given after you attempt it . This will ensure you know the basic concepts well.
Problem 5 – Tutorial 2
Problem B5 (Problem 4-156)A rigid tank initially contains saturated liquid-vapor mixture of refrigerant-134a. A valve at the bottom of the tank is opened, and the liquid is withdrawn from the tank at constant pressure until no liquid remains inside. The amount of heat transfer is to be determined.
Q
R-134aSat. vaporP=800kPaV=0.1m3
Solution to Problem B5:Assumptions
! There is an unsteady process since the conditions within the device are changing during the process, but it can be analyzed as a uniform-flow process since the state of fluid leaving the device remains constant.
! Kinetic and potential energies are negligible.
! There are no work interactions involved.
! The direction of heat transfer is to the tank (will be verified)
Solution to Problem B-5 (cont’d)
Properties
The properties of R-134a are (Tables A-11 through A-13)
kgmkgmkPaP gf /0255.0,/0008454.0800 331 ==→= νν
kgkJukgkJu gf /78.243,/75.92 ==
==
==⇒
=
kgkJuukgm
vaprsatkPaP
kPag
kPag
/78.243
/0255.0.
800
800@2
3800@22 νν
kgkJhhliquidsat
kPaPkPafe
e /42.93.
800800@ ==⇒
=
Q
R-134aSat. vaporP=800kPaV=0.1m3
Solution to Problem B-5 (cont’d)
Analysis
We take the tank as the system, which is a control volume since mass crosses the boundary. Noting that the microscopic energies of flowing and nonflowing fluids are represented by enthalpy h and internal energy u, respectively, the mass and energy balances for this uniform-flow system can be expressed as
Q
R-134aSat. vaporP=800kPaV=0.1m3
Mass balance: 21 mmmmmm esystemoutin −=→∆=−
32143421 systemoutin EEE ∆=−Energy balance:
Change in internal, kinetic,Potential, etc. energies
Net energy transfer By heat, work, and mass
)0(1122 ≅≅≅−+= pekeSinceWumumhmQ eein
Solution to Problem B-5 (cont’d)
The initial mass, internal energy, and final mass in the tank are
kgkgm
mkgm
mVVmmm
g
g
f
fgf 67.4935.232.47
/0255.06.01.0
/000845.04.01.0
3
3
3
3
1 =+=×+×=+=+=νν
( )( ) ( )( ) kJumumumU ggff 496278.24335.275.9232.47111 =+=+==
kgkgm
mVm 92.3/0255.0
1.03
3
22 ===
νThen from the mass and energy balances,
kgmmme 75.4592.367.4921 =−=−=
( )( ) ( )( ) kJkJkgkJkgkgkJkgQ 6.2674962/78.24392.3/42.9375.451 =−+=
Q
R-134aSat. vaporP=800kPaV=0.1m3
Problem B-6Problem B6 (Problem 4-194) TuorialOne ton of liquid water at 80oC is brought into a room. Determine the final equilibrium temperature in the room .Solution:
Assumptions
1. The room is well insulated and well sealed.2. The thermal properties of water and air are constant.3. Air is well-mixed.
Properties
The gas constant of air is R = 0.287kPa.m3/kg.K (Table A-1). The specific heat of water at room temperature is C = 4.18kJ/kg. oC (Table A-3).
HeatWater80 oC
4m × 5m × 6m
Room 22 oC100kPa
Analysis
The volume and the mass of the air in the room are V = 4 × 5 ×6 = 120 m3
Solution to Problem B-6 (cont’d)
Solution:
HeatWater80 oC
4m × 5m × 6m
Room 22 oC100kPa
( )( )( )( ) kg
KKkgmkPamkPa
RTVPmair 7.141
295/287.0120100
3
3
1
11 =⋅⋅
==
Taking the contents of the room, including the water, as our system,
32143421 systemoutin EEE ∆=−Energy balance:
Change in internal, kinetic,Potential, etc. energies
Net energy transfer by heat, work, and mass
So
( ) ( )airwater UUU ∆+∆=∆=0
( )[ ] ( )[ ] 01212 =−+− airvwater TTmCTTmC
Or
Solution to Problem B-6 (cont’d)
HeatWater80 oC
4m × 5m × 6m
Room 22 oC100kPa
Substituting,
( )( )( ) ( )( )( ) 022/718.07.14180/181.41000 =−⋅+−⋅ CTCkgkJkgCTCkgkJkg ffoooo
It gives
CTfo6.78=
where fT is the final equilibrium temperature in the room.
Further discussion1. What if there are heat losses from the room?
2. Initially dry air. What if air humidity effect is included? is then a function of humidity.
3. Is room pressure affected by vaporization?
4. What if we have 10 tons of water? Will it all vaporize? What is the humidity condition?
Closing Remarks
! You may select problems for practice from the large number available at the end of Chapter 4. Many are similar so there is no need to work out a very large number.
! You will now move on to study the Second Law which provides a quantitative measure to the quality of energy.
! We will study ENTROPY following the study break.